# Is there a simplification for x power log to base (1/x)? [closed]

Is there a simplification for x^(log base (1/x) of N)?

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## closed as off topic by larsmans, aioobe, AakashM, Russell Troywest, templatetypedefJan 26 '12 at 9:20

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Do you know the value of N ? –  Radu Murzea Jan 26 '12 at 9:02
Wouldn't math.stackexchange.com be a better place for this? –  Russell Troywest Jan 26 '12 at 9:08
Thanks Russell, will keep that in mind. –  user1170883 Jan 26 '12 at 9:29

Yes, it's `1 / N` (the reciprocal of `N`), provided of course that both `N` and `x` are positive and `x != 1`.
``````x^(log[1/x](n)) = e^(log[1/x](n)*ln(x)) = e^((ln(n)/ln(1/x))*ln(x)) = e^(ln(n)*ln(x)/(-ln(x)) = e^(-ln(n)) = 1/n